Let and be the solution curves of the differential equation with initial conditions and respectively. Then the curves and intersect at:
- A
no point
- B
infinite number of points
- C
one point
- D
two points
Let and be the solution curves of the differential equation with initial conditions and respectively. Then the curves and intersect at:
no point
infinite number of points
one point
two points
Correct answer:A
Standard Method
Given: with two initial conditions and .
Find: Whether the curves and intersect.
Solve the differential equation by separation of variables:
Integrating,
So,
Hence,
Now apply the initial conditions.
For ,
Therefore,
and
For ,
Therefore,
and
For intersection, set
So,
which gives
and hence
But is never zero for any real . Therefore, the two curves do not intersect at any point.
The correct option is A.
Direct Observation
Given: Both curves satisfy the same differential equation .
Find: Whether they can meet.
The general solution is
The two initial conditions give different constants: and . Thus the two curves are
Their difference is
Since for every real , the difference is never zero. Therefore the curves never intersect.
The correct option is A.
Setting the two constants of integration equal without using the different initial conditions is incorrect. Each initial condition produces a different particular solution. First find the constants separately, then compare the resulting curves.
Assuming has a real solution is wrong because the exponential function is always positive. When the comparison reduces to , it immediately means there is no intersection.
Forgetting to solve the differential equation completely before checking intersection can lead to guessing from the initial points only. The curves start at different points, but the correct method is to derive both explicit solutions and then equate them.
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